Find the vector component of `vecF=hati+2hatj+2hatk` along and perpendicular to the direction of `vecp=-3hati-4hatj+12hatk` in the plane of `vecF and vecP`,

Find the vector components of a vector 2hati+3hatj+6hatk along and perpendicular to the non zero vector 2hati+hatj+2hatk

The componant of vector 2 hati -3 hatj +2hatk perpendicular to the vector hati + -3 hatj + hatk is-

Find component of vector vec(a)=hati+hatj+3hatk in directions parallel to and perpendicular to vector vecb=hati+hatj .

The component of hati in the direction of vector hati+hatj+2hatk is

The vector component of vector vecA =3hati +4hatj +5hatk along vector vecB =hati +hatj +hatk is :

If a vector (2hati+3hatj+ 8hatk) is perpendicular to the vector (4hatj-4hati+alpha hatk) , then find the value of alpha is

If vecP = 3hati+ 4hatj + 12hatk then find magnitude and the direction cosines of vecP .

Find the scalar components of a unit vector which is perpendicular to each of the vectors hati+2hatj-hatk and 3hati-hatj+2hatk .

Find the equation of the plane through the point hati+4hatj-2hatk and perpendicular to the line of intersection of the planes vecr.(hati+hatj+hatk)=10 and vecr.(2hati-hatj+3hatk)=18.